Construction of a Rapoport-Zink space for GU(1,1) in the ramified 2-adic case

Abstract

Let F|Q2 be a finite extension. In this paper, we construct an RZ-space NE for split GU(1,1) over a ramified quadratic extension E|F. For this, we first introduce the naive moduli problem NEnaive and then define NE ⊂eq NEnaive as a canonical closed formal subscheme, using the so-called straightening condition. We establish an isomorphism between NE and the Drinfeld moduli problem, proving the 2-adic analogue of a theorem of Kudla and Rapoport. The formulation of the straightening condition uses the existence of certain polarizations on the points of the moduli space NEnaive. We show the existence of these polarizations in a more general setting over any quadratic extension E|F, where F|Qp is a finite extension for any prime p.